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[PACKET 5.1: POLYGON ∡-SUM THEOREM] 1
We all know that the sum of the angles of a triangle equal 180°. What about a quadrilateral? A pentagon? We can answer this question by looking for a pattern:
⋮
Polygon Angle-Sum Theorem:
The sum of the measures of the interior angles of a polygon is ___________________ where n is the number of sides of the polygon.
# of Sides
Picture # of Δ’s sum of all interior angles
3
4
5
6
n
Write your questions here!
Name______________________ Must pass Mastery Check by:___________
2 PACKET 5.1: POLYGON ∡-SUM THEOREM
Find x.
What about Regular Polygons? Because each polygon with n sides also has n angles of equal measure, you can divide the sum of the angles by n to find the measure of one angle.
Regular Polygon Interior Angle Theorem:
The measure of ONE of the interior angles of a regular polygon is ___________________ where n is the number of sides of the polygon.
What about Exterior Angles?
Polygon Exterior Angle-Sum Theorem: The sum of the measures of the exterior angles of ANY polygon is 360°.
Write your questions here!
[PACKET 5.1: POLYGON ∡-SUM THEOREM] 3
Find the measure of one interior angle in each regular polygon. 1. 2. regular 15-‐gon Find the measure of one exterior angle in each regular polygon. 3. 4. regular 13-‐gon
Find the sum of the interior angles for each polygon.
5. a decagon 6.
Find the value of each variable:
Write your questions here!
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Always check your work!Worksheet by Kuta Software LLC
Geometry
©Z b230Z1L2G UKLuAtlaE WSboSfmthwfaqruep NLKLKCX.E E DAolnll MrWimgQhjtOsj lrheGs1ezrnvYezdL.t Practice 5.1
Find the interior angle sum for each polygon. Round your answer to the nearest tenth if necessary.
1) 2)
3) regular 19-gon 4) regular 14-gon
Find the measure of one exterior angle in each regular polygon. Round your answer to the nearest tenth ifnecessary.
5) 6)
7) regular octagon 8) regular 15-gon
9) regular 11-gon 10) regular pentagon
Find the measure of one interior angle in each regular polygon. Round your answer to the nearest tenth ifnecessary.
11) 12)
13) regular 14-gon 14) regular 24-gon
15) regular 20-gon 16) regular 17-gon
4 PACKET 5.1: POLYGON ∡-SUM THEOREM
1. Find the measure of one interior angle in a regular 14-‐gon.
2. Find the measure of one exterior angle in a regular 20-‐gon.
For problems 3 – 5, find the value of x.
3._______________________ 4. ______________________ 5. ______________________
6.
7. The exterior angle of a polygon is 24°. Find the number of sides in the polygon.
[PACKET 5.1: POLYGON ∡-SUM THEOREM] 5
A tessellation is a pattern of congruent figures that completely covers a plane without gaps or overlaps. A tessellation that consists of exactly one type of regular polygon, with each polygon congruent to all the others, is called a regular tessellation. Any point where the polygons share a common vertex is a vertex point of the tessellation. The figure at right, for instance, shows a regular tessellation of equilateral triangles with one vertex point labeled A.
For Exercises 11–14, refer to the regular tessellation to the right.
11. What is the measure of each interior angle of each equilateral triangle? ________
12. How many equilateral triangles meet at each vertex point? _________________
13. What is the sum of the measures of all the angles at each vertex point? _______________
14. Based on your answers to Exercises 11–13, explain why it is not possible to make a regular tessellation thatconsists of regular pentagons.
Alg
ebra
Rev
iew
Solve each equation for x!
1. -2x – 3 = 5x - 31 2. 2 (x – 5) – 2 = -4
Multiply! Factor!
3. (x – 4)(x + 2) 4. (x2 + 6x + 8)
5. Graph the equation:
y = 2 -‐ x
6. Graph the equation:
y = -‐⅘x
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